Joonas has an unlimited supply of €5 notes and €2 coins - Junior Cycle Mathematics - Question 7 - 2018

For the last way (Way 3), we will use 5 €5 notes. This contributes €25 to our total. Therefore, to reach €27, we need an additional €2:

• Number of €5 notes: 5
• Number of €2 coins: 1

Now the table is complete:

To create every whole number value greater than €3, Joonas can utilize his unlimited supply of €5 notes and €2 coins in a systematic way.

1. Using €2 coins: Every even number amount can be obtained using €2 coins alone. Every odd number can be crafted by pairing an odd quantity of €2 coins with a single €5 note. For example:

   • No €2 coins leads to €5— all odd amounts ending in 0 or 5.
   • One €2 coin gives: €2, €7; all odd amounts ending in 2 or 7.
   • Two €2 coins give: €4, €9; all odd amounts ending in 4 or 9.
   • Three €2 coins yield: €6, €11; all odd amounts ending in 6 or 1.
   • Four €2 coins provide: €8, €13; all odd amounts ending in 8 or 3.

2. General Method: By using 5 + 2k (where k is any non-negative integer), Joonas can achieve every even number. Adding one €5 note to these combinations, he can generate every odd number greater than €3.

In summary, with this combination, all values greater than €3 can be achieved.